Teleparallel gravity: from theory to cosmology

Bahamonde, Sebastián; Dialektopoulos, Konstantinos F.; Escamilla-Rivera, Celia; Farrugia, Gabriel; Gakis, Viktor; Hendry, M.; Hohmann, Manuel; Said, Jackson Levi; Mifsud, Jurgen; Valentino, Eleonora Di

doi:10.1088/1361-6633/ac9cef

Cited by 136 publications

(74 citation statements)

References 889 publications

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“…We now can turn to the study of the electronic degrees of freedom in an elastic medium with a wedge dislocations from the perspective of the Weitzenböck geometry. In this perspective we introduce the Dirac equation in the farmework of the teleparallel Fock-Ivanenko covariant derivative [28,29] . The equation we want to study is:…”

Section: Wedge Discloations and Dirac Equationmentioning

confidence: 99%

“…In this case, the Riemann-Cartan geometry is reduced to a space of absolute parallelism giving an analogue of teleparallel gravity. In this theory, the Riemann curvature is determined by the torsion tensor which depends on the Weitzenböck connection (see [28,29] and references therein for more details). In the rest of the paper we use the notation of [28], where • , • denote the quantities given by the Levi-Civita and Weitzenböck connection, respectively.…”

Section: Introductionmentioning

confidence: 99%

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Revisiting the electronic properties of dislocated graphene sheets

Fernández¹,

Pujol²,

Solís³

et al. 2023

Preprint

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The interplay between topological defects, such as dislocations or disclinations, and the electronic degrees of freedom in graphene has been extensively studied. In the literature, for the study of this kind of problems, it is in general used either a gauge theory or a curved spatial Riemannian geometry approach, where, in the geometric case, the information about the defects is contained in the metric and the spin-connection. However, these topological defects can also be associated to a Riemann-Cartan geometry where curvature and torsion plays an important role. In this article we study the interplay between a wedge dislocations in a planar graphene sheet and the properties of its electronic degrees of freedom. Our approach relies in its relation with elasticity theory through the so called elastic-gauge, where their typical coefficients, as for example the Poisson's ratio, appear directly in the metric, and consequently also in the electronic spectrum.

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Section: Wedge Discloations and Dirac Equationmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Revisiting the electronic properties of dislocated graphene sheets

Fernández¹,

Pujol²,

Solís³

et al. 2023

Preprint

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“…In this piece of study we are interested on the evolution of the cosmological parameters in a Kantowski-Sachs background geometry in scalar-torsion theory [52]. Scalar-torsion is the analogue of scalar-tensor theory [53] in teleparallelism [54], in which a non-minimally coupled scalar field is introduced into the gravitational Action Integral and it is coupled to the torsion scalar T . Scalar-torsion is a theory of special interest in cosmological studies because it provides a geometric mechanism for the explanation of the acceleration phases of the universe [55,56], as a unification in the dark sector components of the universe [57].…”

Section: Introductionmentioning

confidence: 99%

Kantowski-Sachs cosmology in scalar-torsion theory

Paliathanasis¹

2023

Preprint

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In the context of scalar-torsion theory we investigate the evolution of the cosmological anisotropies for a Kantowski-Sachs background geometry. We study the phase-space of the gravitational field equations by determining the admitted stationary points and study their stability properties. For the potential function of the non-minimally coupled scalar field we assume the exponential and the power-law functions. Finally, we make use of Poincare variables in order to investigate the existence of stationary points at the infinity regime of the dynamics.

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“…There is a plethora of modified theories inspired by teleparallelism with many interesting results in cosmology and astrophysics 16–24 . For reviews in teleparallelism, we refer the reader to references 25,26 …”

Section: Introductionmentioning

confidence: 99%

f(T,B) gravity in a Friedmann–Lemaître–Robertson–Walker universe with nonzero spatial curvature

Paliathanasis

León

2022

Math Methods in App Sciences

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We investigate exact solutions and the asymptotic dynamics for the Friedmann-Lemaître-Robertson-Walker universe with nonzero spatial curvature in the fourth-order modified teleparallel gravitational theory known as 𝑓 (T, B) theory. We show that the field equations admit a minisuperspace description, and they can reproduce any exact form of the scale factor. Moreover, we calculate the equilibrium points and analyze their stability. We show that Milne and Milne-like solutions are supported, and the de Sitter universe is provided. To complete our analysis, we use Poincaré variables to investigate the dynamics at infinity.

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Teleparallel gravity: from theory to cosmology

Cited by 136 publications

References 889 publications

Revisiting the electronic properties of dislocated graphene sheets

Revisiting the electronic properties of dislocated graphene sheets

Kantowski-Sachs cosmology in scalar-torsion theory

f(T,B) gravity in a Friedmann–Lemaître–Robertson–Walker universe with nonzero spatial curvature

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